The average power carried by a sinusoidal wave on a string is given by: 
 
$P=\frac{1}{2}\mu A^2{\omega }^{2}v$ --(1)
 
 The speed of a periodic wave u with wavelength and frequency f is given by: 
 
$v=f\times \lambda$ --(2)
 
 And the relation between the angular speed of a wave and its frequency is: 
 

$w=2\pi f$--(3)

First, rearrange equation (2), so we get a relation between the frequency and the wavelength: 
 

$f=\frac{v}{\lambda }$

Substitute for f into relation (3), we get: 
 
$\omega =\frac{2\pi v}{\lambda }$ 
 
 Now,substitute for w into equation (1), so we get: 

$P_{avg}=\frac{1}{2}\sqrt{\mu T}{\left(\frac{2\pi v}{\lambda }\right)}^2 A^2$
 
 The average power carried by the wave is inversely proportional to the square of its wavelength: 
 
$$\begin{gathered} P_{avg} \alpha \frac{1}{{\lambda }^2} \\ \frac{P_{avg,2}}{P_{avg,1}}=\frac{{{\lambda }_1}^2}{{{\lambda }_2}^2} \end{gathered}$$ 

 
 So, when the wavelength is doubled ($\lambda$₂ = 2$\lambda$₁), the average power becomes: 

$$\begin{gathered} \frac{P_{avg,2}}{P_{avg,1}}=\frac{{{\lambda }_1}^2}{{\left(2{\lambda }_1\right)}^2} \\ =\frac{1}{4} \\ P_{avg,2}=\frac{P_{avg,1}}{4} \end{gathered}$$
 
Now, put in the value for P_avg,1 = 0.400W, so we get: 
 
 $$\begin{gathered} P_{avg,2}=\frac{0.400W}{4} \\ =0.100W \\ {P}_{avg,2}=0.100W \end{gathered}$$

Therefore, the average power carried by the waves is $P_{avg,2}=0.100W$.